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I have a symmetrical graph and created a tree with all shortest path from a random vertex to any other vertex. Can I use the tree to construct a Minimum Spanning Tree(MST)? My algorithm is similar to depth-first algorithm.

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No, because the shortest path from A to B and from A to C will not tell you the shortest path from B to C. –  Tyler Durden Jul 5 '13 at 17:37
can you explain? when you have 3 vertex mst is a-b and a-c. no need b-c? –  Phpdevpad Jul 5 '13 at 17:42
"mst is a-b and a-c" --- it's an "st" all right, but why is it "m"? –  n.m. Jul 5 '13 at 17:46
why it's a-b-c? I have all shortest path. –  Phpdevpad Jul 5 '13 at 17:51
not sure why you freaking. my accuracy isn't so good. –  Phpdevpad Jul 5 '13 at 18:53

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In the worst case, a shortest path tree does not help in finding a minimum spanning tree. Consider a graph where we want to find the MST. Add a source vertex with edges of an identical large length to each other vertex. The shortest path tree from that source consists of the very long edges, which we knew a priori, hence the shortest path tree is not useful in this case.

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It's not answering my question. It's like @tyler comment. –  Phpdevpad Jul 5 '13 at 18:10
@Phpdna Suppose a-b has length 100 and a-c has length 100 and b-c has length 1. The shortest path tree rooted at a is a-b and a-c. The MST is b-c and one of the other edges. –  David Eisenstat Jul 5 '13 at 18:16
but mst needs to visit all vertex. if you can merge the shortest path you have the mst. –  Phpdevpad Jul 5 '13 at 18:21

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